10-24 (5 minutes) Bell Ringer Periods 02 and 08 Packet Do #1 (find perimeter and area), #2 and #3 Keep the other worksheet on 1-6. Turn in your construction worksheet on perpendiculars only.

B. See diagram. Find the perimeter and area of a parallelogram with vertices A(-2, 4) B(3, 4) C(5, 1) and D(0, 1). Copy all 4 vertices in your notes before I put up the diagram. P (parallelogram) = 2l + 2w (Same as a rectangle) A (parallelogram) = bh or lw (Same as a rectangle) The height must be perpendicular to the base.

B. Find the circumference and area of the figure. Find Perimeter and Area B. Find the circumference and area of the figure. 8 Leave in your answer. ≈ 25.1 Use a calculator. Answer: The circumference of the circle is about 25.1 inches. Example 2

B. Find the circumference and area of the figure. Find Perimeter and Area B. Find the circumference and area of the figure. 16 Leave in your answer ≈ 50.3 Use a calculator. Answer: The area of the circle is about 50.3 square inches. Example 2

Packet Do 4, 6, 7

p. 62 Do 27 (Use the graph paper provided in the basket)

A square with side length of 5 feet B circle with the radius of 3 feet Largest Area Terri has 19 feet of tape to mark an area in the classroom where the students may read. Which of these shapes has a perimeter or circumference that would use most or all of the tape? A square with side length of 5 feet B circle with the radius of 3 feet C right triangle with each leg length of 6 feet D rectangle with a length of 8 feet and a width of 3 feet Read the Test Item You are asked to compare the perimeters or circumference of four different shapes. Example 3

Find each perimeter or circumference. Largest Area Solve the Test Item Find each perimeter or circumference. Square P = 4s Perimeter of a square = 4(5) s = 5 = 20 feet Simplify. Circle C = 2r Circumference = 2(3) r = 3 = 6 Simplify. ≈ 18.85 feet Use a calculator. Example 3

Use the Pythagorean Theorem to find the length of the hypotenuse. Largest Area Right Triangle Use the Pythagorean Theorem to find the length of the hypotenuse. c2 = a2 + b2 Pythagorean Theorem = 62 + 62 a = 6, b = 6 = 72 Simplify. . ≈ 8.49 Use a calculator. P = a + b + c Perimeter of a triangle  6 + 6 + 8.49 Substitution  20.49 feet Simplify. Example 3

P = 2ℓ + 2w Perimeter of a rectangle = 2(8) + 2(3) ℓ = 8, w = 3 Largest Area Rectangle P = 2ℓ + 2w Perimeter of a rectangle = 2(8) + 2(3) ℓ = 8, w = 3 = 22 feet Simplify. The only shape for which Terri has enough tape is the circle. Answer: The correct answer is B. Example 3

Packet 3, 6, 7, 10, 13

Perimeter and Area on the Coordinate Plane Find the perimeter and area of a pentagon ABCDE with A(0, 4), B(4, 0), C(3, –4), D(–3, –4), and E(–3, 1). Example 4

Perimeter and Area on the Coordinate Plane Step 1 By counting squares on the grid, we find that CD = 6 units and DE = 5 units. Use the Distance Formula, to find AB, BC, and EA. Example 4

Perimeter and Area on the Coordinate Plane The perimeter of pentagon ABCDE is 5.7 + 4.1 + 6 + 5 + 4.2 or about 25 units. Example 4

Divide the pentagon into two triangles and a rectangle. Perimeter and Area on the Coordinate Plane Step 2 Divide the pentagon into two triangles and a rectangle. Find the area of the triangles. Area of Triangle 1 Area of a triangle Substitute. Simplify. Example 4

Area of Triangle 2 Substitute. Simplify. Perimeter and Area on the Coordinate Plane Area of Triangle 2 Substitute. Simplify. Example 4